Add to ORKGWe study the estimation problem for linear time-invariant (LTI) state-space models with Gaussian excitation of an unknown covariance. We provide non asymptotic lower bounds for the expected estimation error and the mean square estimation risk of the least square estimator, and the minimax mean square estimation risk. These bounds are sharp with explicit constants when the matrix of the dynamics has no eigenvalues on the unit circle and are rate-optimal when they do. Our results extend and improve existing lower bounds to lower bounds in expectation of the mean square estimation risk and to systems with a general noise covariance. Instrumental to our derivation are new concentration results for rescaled sample covariances and deviation resul...
We consider the one-step prediction problem for discrete-time linear systems in correlated plant and...
We develop a uniform Cramer-Rao lower bound (UCRLB) on the total variance of any estimator of an un-...
Recently several new results for Cramer-Rao lower bounds (CRLBs) in dynamical systems have been deve...
We study the estimation problem for linear time-invariant (LTI) state-space models with Gaussian exc...
The aim of this article is to show a simple way to construct asymptotic minimax lower bounds for ris...
Partial non-Gaussian state-space models include many models of interest while keeping a convenient a...
Parametric Cramer-Rao lower bounds (CRLBs) are given for discrete-time systems with non-zero process...
This paper addresses subspace-based estimation and its pur-pose is to complement previously availabl...
Wahl M. Van Trees inequality, group equivariance, and estimation of principal subspaces. arXiv:2107...
In the parametric estimation context, estimators performances can be characterized, inter alia, by t...
We study parameter estimation in linear Gaussian covariance models, which are p-dimensional Gaussian...
We consider the one-step prediction problem for discrete-time linear systems in correlated Gaussian ...
International audienceThis correspondence deals with the minimum variance estimation of a Gaussian p...
This thesis consists of five appended papers devoted to modeling tasks where the desired models are ...
Calculation of the Cramer-Rao lower bound, i.e., the inverse of the Fisher information matrix, for o...
We consider the one-step prediction problem for discrete-time linear systems in correlated plant and...
We develop a uniform Cramer-Rao lower bound (UCRLB) on the total variance of any estimator of an un-...
Recently several new results for Cramer-Rao lower bounds (CRLBs) in dynamical systems have been deve...
We study the estimation problem for linear time-invariant (LTI) state-space models with Gaussian exc...
The aim of this article is to show a simple way to construct asymptotic minimax lower bounds for ris...
Partial non-Gaussian state-space models include many models of interest while keeping a convenient a...
Parametric Cramer-Rao lower bounds (CRLBs) are given for discrete-time systems with non-zero process...
This paper addresses subspace-based estimation and its pur-pose is to complement previously availabl...
Wahl M. Van Trees inequality, group equivariance, and estimation of principal subspaces. arXiv:2107...
In the parametric estimation context, estimators performances can be characterized, inter alia, by t...
We study parameter estimation in linear Gaussian covariance models, which are p-dimensional Gaussian...
We consider the one-step prediction problem for discrete-time linear systems in correlated Gaussian ...
International audienceThis correspondence deals with the minimum variance estimation of a Gaussian p...
This thesis consists of five appended papers devoted to modeling tasks where the desired models are ...
Calculation of the Cramer-Rao lower bound, i.e., the inverse of the Fisher information matrix, for o...
We consider the one-step prediction problem for discrete-time linear systems in correlated plant and...
We develop a uniform Cramer-Rao lower bound (UCRLB) on the total variance of any estimator of an un-...
Recently several new results for Cramer-Rao lower bounds (CRLBs) in dynamical systems have been deve...